The Volterra lattice is the set of ordinary differential equations for functions a_n:

${\displaystyle a_{n}'=a_{n}(a_{n+1}+a_{n-1})}$ 

where n is an integer. Usually one adds boundary conditions: for example, the functions a_n could be periodic: a_n = a_n+N for some N, or could vanish for n ≤ 0 and n ≥ N.

The Volterra lattice was originally stated in terms of the variables R_n = –log a_n in which case the equations are

${\displaystyle R_{n}'=e^{R_{n-1}}+e^{R_{n+1}}}$ 

• Kac, M.; van Moerbeke, P. (1975), "Some probabilistic aspects of scattering theory", in Arthurs, A.M. (ed.), Functional integration and its applications (Proc. Internat. Conf., London, 1974), Oxford: Clarendon Press, pp. 87–96, ISBN 978-0198533467, MR 0481238
• Kac, M.; van Moerbeke, Pierre (1975), "On an explicitly soluble system of nonlinear differential equations related to certain Toda lattices.", Advances in Mathematics, 16 (2): 160–169, doi:10.1016/0001-8708(75)90148-6, MR 0369953
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